Answer:
d. substitution bias.
Explanation:
Price changes from year to year are not proportional, and consumers respond to these changes by altering their spending patterns. The problem this creates for inflation calculations is called substitution bias.
A problem with the Consumer Price Index (CPI) arises from the singular fact that, when the price level of a product becomes relatively less expensive or lower, consumers tend to buy more quantity of the product and consequently, a lesser quantity of goods that are relatively more expensive.
Hence, their spending pattern changes with respect to the prices but it's not completely adjusted with the Consumer Price Index (CPI), thus, making the inflation rate to differ because of the problem of substitution bias.
Answer:
b.to evaluate the company's stock performance
Explanation:
Evaluating a company stock performance would interest investors more than the managers of the company. Investors are profits driven. Their primary concern is to predict the future price of a stock as accurately as possible and profit from the price movement.
Managers are concerned with the profitability and long term growth of the company. They use managerial information to understand the current state and make better plans for the future. Managers use managerial reports to identify areas that need cost-cutting to maximize the profits.
<span>The program rating is 26.
HUT x Share = Rating (HH)
</span>65 x .40 = 26
If none of the children are willing to pay than the bank will take the house back if the father had a loan on it.
Answer:
v(t) = (2t + 1)i + 3t²j + 4t³k
r(t) = (t² + t)i + (t³ + 7)j + (t⁴ - 4)k
Explanation:
a(t) = 2i + 6tj + 12t²k
v(t) = ∫a(t)dt
= ∫(2i + 6tj + 12t²k)dt
= 2ti + (6t²/2)j + (12t³/3)k + c
= 2ti + 3t²j + 4t³k + c
v(0) = i
i = 0i + 0j + 0k + c
c = i
∴ v(t) = 2ti + 3t²j + 4t³k + i
v(t) = (2t + 1)i + 3t²j + 4t³k
r(t) = ∫ v(t)dt
= i ∫ (2t + 1)dt + 3j ∫ t²dt + 4k ∫ t³dt
= i (2t²/2 + t) + 3j(t³/3) + 4k(t⁴/4) + d
= i (t² + t) + jt³ + t⁴k + d
r(0) = 7j - 4k
0i + 0j + 0k + d = 7j - 4k
d = 7j - 4k
∴ r(t) = (t² + t)i + t³j + t⁴k + 7j - 4k
r(t) = (t² + t)i + (t³ + 7)j + (t⁴ - 4)k